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   Copyright 1995 by the CREATION RESEARCH SOCIETY (CRS), Inc.

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        THE SCIENTIFIC EXISTENCE OF A HIGHER INTELLIGENCE

        ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

                  by Robert A. Herrmann, Ph.D.

          Mathematics Department, U. S. Naval Academy,

           572 Holloway Rd., Annapolis, Md 21402-5002.



          Received 22 April, 1993; Revised 18 June 1993

          Creation Research Society Quarterly 30(4):218

                           March, 1994



<Abstract> This article gives a general overview of recent 

results in mathematical logic that should have a profound effect 

not only upon the foundations of creation-science but the 

foundations of all religious experiences and thought that either 

assume or logically require the existence of a supernatural 

higher intelligence. In particular, it is shown that the concept 

of the existence of a higher intelligence exterior to the 

material universe can be modeled rationally by means of the 

science of mathematics. It is established that human religious 

experiences and scientific models associated with either an 

assumption of or an implied requirement that a supernatural 

higher intelligence exists are not somehow or other irrational in 

character as it is claimed by many secular scientists and 

philosophers. Indeed, if such experiences or creation-science 

models directly correlate to certain customary Bible 

interpretations, then the assumption of irrationality is 

scientifically proved to be false.



*Introduction*



When concepts relative to the DNA molecule are modeled by means 

of information theory, one aspect of the obtained theoretical 

conclusions seems to defy human comprehension unless a very 

special postulate is assumed. As Wilder-Smith (1993) states: 



  "We are forced to come back to basics and assume that there 

  must have been in the beginning -- at the act of creation -- an 

  organ of the kind that makes the human brain tick (but    

  infinitely more powerful, of course) to generate the concepts 

  of biology on a much larger scale than the human brain can ever 

  develop."



Under the further assumption that all life throughout the 

universe is associated with DNA type molecules and that such 

natural processes are amenable to human thought, then such a 

higher intelligence could not be assigned to biological entities 

within the universe itself. Using the term natural to refer to 

entities, processes, and the like that are within our universe, 

under these assumptions, information theory leads to the 

conclusion that the acceptance of a supernatural higher 

intelligence would be needed in order to properly comprehend the 

model. Unfortunately, the assumption that a supernatural higher 

intelligence exists has been rejected by secular scientists and 

atheistic philosophers as not being consistent with scientific 

logic. Indeed, one of the greatest onslaughts against such an 

assumption and all of the human (religious) experiences that are 

modeled by using such an assumption began in earnest with the 

introduction of the philosophy of ``rationalism.'' This 

philosophy claims that explanations for religious experiences or 

perceived phenomena that include supernatural entities external 

to the natural world are irrational in character. The concept of 

irrational refers to what is considered to be contrary to certain 

established human thought patterns.



Rationalism implies that if you cannot rationally justify the 

existence of such a higher intelligence, especially as such an 

intelligence relates to experiences within the natural world, 

then it is necessary to replace hypotheses stated in specified 

supernatural terms with hypotheses stated in natural terms. 

Feuerbach (1967, p. 110) stated this claim as follows: 



  ". . . there is no way of explaining the thousands and 

  thousands of contradictions, perplexities, difficulties, and 

  inconsistencies in which religious belief involves us, unless 

  we acknowledge that the original God was a being abstracted 

  from nature . . . ." 



Feuerbach (1967, p. 248) also states: "Moreover, religious ideals 

have always involved all manner of irrational and even 

superstitious conceptions." He even  attacks the rationalists as 

being incomplete rationalists. 



  ". . . the rationalists take great pains to point out the 

  obvious fallacies of religion; but these are secondary, 

  subordinate fallacies; as for the fundamental fallacies, which 

  have all others as consequences, the same rationalists let them 

  stand, for they are sacred and inviolable. Consequently, when a

  rationalist asks an atheist what atheism is, the proper answer 

  is: Rationalism is a half-baked, incomplete atheism; atheism is 

  a complete and thoroughgoing rationalism." (Feuerbach, 1967, pp. 

  259-260).



From Feuerbach's viewpoint, the hypothesis of the nonexistence of 

a higher intelligence exterior to the natural world, of God, is 

the ultimately correct hypothesis from which to begin a complete 

rationalization for all religious experiences and perceived 

phenomena. Since Feuerbach's lectures, these ideas have been 

championed by numerous influential philosophers, scientists and 

social reformers. Marx (1960, p. 24), using logical terminology, 

states it by writing: "Christianity, . . ., cannot agree with 

reason because `worldly' and `religious' reason contradict each 

other." Santayana (1905, p. 159), utilizing a destructive term 

taken from the language of logic, writes: 



  ". . . the grand contradiction is the idea that the same God 

  who is the ideal of human aspiration is also the creator of 

  the universe and the only primary substance."



In this age of scientism, influential humanists, scientists, 

journalists and the like continue to parrot these claims of 

Feuerbach with the added proviso that the assumption of the 

existence of a supernatural higher intelligence will contradict 

absolutely the logical procedures accepted by the scientific 

community. One quotation will suffice as an example of this world-

view. H. J. Eysenck (1973, pp. 89-90) writes: 



  "Thus the first part of my definition of humanism would involve

  a stress on the use of reason in dealing with inanimate nature 

  and with other human beings . . . . This inevitably involves the 

  rejection of revealed religion . . . . All humanists are agreed 

  that religion is not based on reason . . . . To me, the word 

  reason in this respect implies science. Science is the 

  embodiment of the rational attempts to solve problems posed by 

  nature or human beings . . . . Reason, to me, marks out the 

  method to be used by all humanists."



Individuals who have either had personal religious experiences or 

argue for the scientific acceptance of such a higher intelligence 

certainly do not consider their contributions as irrational. As 

exemplified by the above quotations, many in the philosophic and 

scientific world do consider as irrational the assumption that 

such an higher intelligence needs to be supernatural in character 

and this has inspired their attempts at rationalizing religious 

experiences, or ignoring creation-science models and evidence for 

the acceptance of such models.



If it could be demonstrated scientifically that assuming the 

existence of a supernatural higher intelligence is rational  in 

character, then this would destroy, utterly and completely, the 

philosophical foundations for the philosophy of rationalism as it 

is applied to religious experiences and thought. It would 

eliminate the basic philosophical argument against the existence 

of a supernatural deity. Atheism would have lost its most 

profound intellectual foundation. Further, the necessary 

conclusions of information theory applied to the DNA molecule 

would be upheld and, indeed, the basic foundation of creation-

science could no longer be rejected on scientific grounds. But 

what would constitute a scientific demonstration that it is 

rational to postulate the existence of a supernatural higher 

intelligence?



Timothy Ferris (1979, p. 157) writes: "Scientific theories must 

be logical. They must be expressible in terms of mathematics, the 

most rigorous logical system known." Ferris overstates his 

conclusion when he writes that this ``must'' be the case. 

Actually, the modern scientific approach to theory is rather more 

vague on the subject of rationality. What can be said is that if 

a theory can be closely associated with a mathematical structure, 

then it would follow the most rigorous logical system known.



*Human Intelligence*



No attempt will be made in this paper to give a nearly complete 

definition of human intelligence. But one of the crowning 

achievements of humanity has been the construction of a symbolic 

language as a substitute for oral expressions. Modern computer 

technology also allows for visual or audio impressions that are 

captured by mechanical devices to be translated into a symbolic 

language that can later reproduce, with great clarity, the 

original visual or audio content. Thus, for our purposes, human 

intelligence will include the ability to express thoughts and 

perceptions in a symbolic language comprehensible by others and, 

further, to present written arguments that follow patterns that 

correspond logically to procedures accepted by the majority of 

humanity.



Throughout this discussion, it will only be assumed that a 

symbolic language corresponds to a portion of human oral 

expression, human perception and mental impression. A symbolic 

language L is constructed intuitively from two or more symbols by 

juxtaposition and yields geometric configurations called symbol 

strings (i.e. strings of symbols). For every natural number n, 

there theoretically exists more than n distinct symbol strings by 

this process. Similar symbol strings are recognized by human 

perception to be equivalent.



In 1930, Tarski characterized and abstracted mathematically those 

general procedures that correspond to the most significant human 

mental processes that, for finite collects of such symbol 

strings, yield deductive conclusions. The mathematical operator 

so obtained is termed a consequence operator. In modern 

mathematical logic, there are two types of such logic operators. 

The most basic is the finitary consequence operator of Tarski 

(1930). However, there is a similar operator that is more general 

in character and is often termed simply as a consequence 

operator.



The small amount of set-theoretic language that is employed in 

this paper is taken from a standard high-school algebra course 

and, in some cases, is only considered as an abbreviation. 

Indeed, each abbreviation is specifically defined. No actual 

mathematics appears in this paper. The formal mathematics can be 

found in Herrmann (1987, 1991). The symbol used to represent the 

finitary consequence operator is the symbol Cn. The more general 

consequence operator is often denoted simply by C. Informally, 

such operators take any subset A of L (i.e. A subset L) and yield 

all those members of L that can be deduced from A (i.e. Cn(A)). A 

basic requirement is that the assumed premises can always be 

deduced logically (i.e. A subset Cn(A)). Once a human being has 

deduced all of the consequences, then no more consequences can be 

deduced from the same set of premises (i.e. Cn(Cn(A)) =Cn(A)). 

For C, if one set of premises B is a subset of another such set A 

(i.e B subset A subset L), then deductions from B form a subset 

of those deductions from A (i.e. C(B) subset C(A)). For a 

finitary consequence operator, the human argument of using only 

finitely many symbol strings from a set of premises A to obtain a 

deduction is modeled by the  additional requirement that if x is  

deduced from  A (i.e. x in Cn(A) or x is a member of Cn(A)), then 

there is a finite set of premises  F subset A such that x can 

also be deduced from F. One can show that this last requirement 

also implies the last property listed for the general consequence 

operator C. Consequence operators that correspond to  specific 

deductive processes such as those defined for propositional, 

predicate, and higher-order formal languages (i.e. those logical 

processes used in modern scientific discourse) can be further 

characterized so that each can be differentiated one from another.



What Tarski did was to take a concrete everyday experience and 

mathematically abstract its most basic properties. From this 

abstraction, mathematical arguments establish other properties. 

These other properties  may then be interpreted with respect to 

the original linguistic terms that generate the Tarski 

abstraction. Thus new insight is gained into what constitutes 

human thought patterns. As will be discussed later, the same type 

of formal abstraction is possible for certain dialectic logics.



In 1978 (Herrmann, 1981), Tarski's consequence operator theory 

was investigated through application of the new mathematical 

discipline called Nonstandard Analysis for the specific purpose 

of finding a nonnumerical model for the concept of subliminal 

perception. Nonstandard does not mean that different mathematical 

procedures are employed. This is a technical term relative to 

abstract model theory. After many years of refinement, the basic 

properties of nonstandard consequence operators appeared in 

mathematical journal form (Herrmann, 1987) and book form 

(Herrmann, 1991). Cosmological interpretations of these results 

have been reported upon numerously many times within other 

scientific and philosophic journals as well. However, also of 

significance is a linguistic interpretation of these fundamental 

results. Generating the mathematical structure is not extremely 

difficult. But interpreting it linguistically has been arduous.



*A Special Linguistic Interpretation*



In order to interpret a formal mathematical structure relative to 

different disciplines, a correspondence is created between terms 

in one discipline and the abstract entities of the structure. 

This actually yields a many-to-one correspondence since numerous 

disciplines can be correlated to the same mathematical structure. 

Each time this is done, a mathematical model is constructed. Our 

interest in this paper is a specific correspondence between some 

terms relative to intelligence, linguistic, and similar human 

activities associated with a physical world and the mathematical 

structure. With respect to nonstandard structures, however, many 

new objects emerge that are not present within the standard 

structure. Although these new objects have all of the properties 

of the original entities and thus the same properties as the 

nonabstract objects from which they were originally abstracted, 

they also have many additional properties not shared by any of 

the original entities. What one does, in this case, is to created 

new terms that have a similar linguistic-like character as the 

original linguistic terms and assign these new terms to 

appropriate unassigned entities within the nonstandard structure. 

But can you assign a concrete dictionary meaning to these new 

terms?



A dictionary meaning to these new terms will not carry the 

appropriate content. One reasonable method to obtain an in-depth 

comprehension is to have a strong understanding of the workings 

of the mathematical structure and to reflect upon the relations 

between these new linguistic-like terms themselves, as well as 

between the new terms and the standard linguistic expressions. 

What this means is that you must study the written statements 

depicting these relationships. The model that this creates forms 

a portion of the deductive world model or, simply, the D-world 

model. There is, however, a new method that has been devised that 

renders these new concepts comprehensible without the necessity 

of an in-depth study. The method is termed negative comparison.



Negative comparison is a description as to how these new concepts 

negatively compare with the original standard concepts. Certain 

aspects of such linguistic type interpretations have been 

discussed elsewhere (Herrmann, 1991) but not as it directly 

relates to the concept of a higher intelligence. Further, this 

present interpretation uses a few special terms not previously 

introduced. The linguistic-like terms that correspond to new 

abstract entities that, at least, have similar properties as the 

original have the prefix ``ultra-'' attached. It is always to be 

understood that prior to each statement one should insert an 

expression such as ``It is rational to assume that . . .'' where 

the term ``rational'' means the logical  processes science uses 

to develop its most cherished theories. To be as simplistic as 

possible within this section, only one of many distinct logical 

processes will be compared. What can be said about this one 

process will hold for all similar processes that can be 

characterized by the consequence operator. Note that logical 

processes are also termed mental processes.



The use of the ``ultra-'' prefix does not remove the term from 

being only a defined mathematical abstraction. Within a 

description, additional phrases that correlate such terms to a 

specific discipline are either inserted or, at least, understood 

by the reader. Relative to a supernatural higher intelligence, 

one basic correlating phrase is ``entity within the universe.'' 

This signifies any corporeal entity of which the human mind can 

conceive and which makes its home within the material universe. 

The insertion of this phrase is the basic change in the 

interpretation from those previously used. Other obvious 

correlating terms will appear when relationships between the 

ultra-objects and the concrete linguistic entities from which the 

model was generated are discussed.



There exists an ultra-language, denoted by *P, that at least has 

all of the properties of the most simplistic of human languages, 

the propositional language P. The language P is a subset of *P. A 

simple informal propositional language P can be constructed from 

but two primitive words such as ``house'' and ``door'' and the 

usual additional symbol strings such as ``or'' ``and'' ``not'' 

and ``implication.'' In this case, all of the expressions in P 

are meaningful in the sense that they impress on the human mind 

various images. Assume that all of the members of P are 

meaningful in this sense. There are many members of the ultra-

language *P that cannot be used for any purposes by, and have no 

specific meaning to, any entity within the universe. However, all 

members of *P are ultra-meaningful. The mathematical model would 

require ``ultra-meaningful'' to correspond to a statement such as 

``they ultra-impress on an ultra-mind various ultra-images.'' 

Remember that deep understanding of what these new terms might 

signify requires an investigation of the relationships between 

such terms as expressed by hundreds of such statements. Suppose S 

denotes the consequence operator that characterizes the simple 

human mental process called propositional (sentential) deduction. 

Then S is a finitary consequence operator and all of the 

consequences S(B) that can be deduced from a set of premises B 

subset P are obtained by deduction from the finite subsets of B. 

Now there exists an ultra-logical process, denoted by D, defined 

on subsets of the ultra-language *P, where D has, at least, the 

same properties as those of the logical process S when D 

operators on finite subsets of the humanly comprehensible 

language P (Note 1).



What happens when the ultra-mental process D is applied to any 

finite subset F of the humanly comprehensible language P. The set 

of consequences D(F) contains all of these consequences S(F) 

comprehensible by entities within the universe (i.e. S(F) subset 

D(F)) and many that are not comprehensible by entities within the 

universe. Using consequence operator terminology, when this 

occurs, the ultra-mental process being modeled by the consequence 

D is said to be stronger than the mental process modeled by S. It 

is this and other, yet to be described, properties that led to 

the selection of the term  ``ultra'' as a prefix. Further, no 

entity within the universe can duplicate the ultra-mental process 

D, and this process also has numerous properties that are not 

comprehensible by any entity within the universe (Note 2).



There is a delicate analysis that can reveal the composition for 

some of the ultra-words in *P, where w in the ultra-language *P 

is an ultra-world if it is not a member of P. What this analysis 

details is often quite startling. For example, there are ultra-

hypotheses, a single one of which is denoted by w, that cannot be 

comprehended by entities within the universe and that, when the 

ultra-mental process D is applied to w, yields a consequence that 

can be comprehended by entities within the universe. These ultra-

hypotheses exist in subsets of *P that, at least, have the same 

characterizing properties as sets that describe human behavior, 

natural laws and the like. For example, if a sentence x in P 

describes a certain human behavior trait, then, although there 

may not appear to be a hypothesis h in P from which x can be 

deduced by the human mind, there does exist in *P an ultra-

hypothesis w such that the ultra-mind process D when applied to w 

yields the conclusion x.



There are other mental processes that seem to correspond to 

intelligence. One of these is choosing from a list of statements, 

that is potentially infinite, a specific finite set that is 

meaningful for a particular application. Embedding this finite 

choice process into the deductive-world model yields the same 

type of conclusions as those for the ultra-logic D. This ultra-

mind process cannot be duplicated by any entity within the 

universe, it is stronger than all such mental processes and has 

properties that in all cases improve upon the mental process of 

finite choice (Herrmann, 1991).



Another human reasoning process is the dialectic. Basic 

characterizing expressions can be listed for many such dialectics 

(Gagnon, 1980). Such dialectics can be applied to any language E 

constructed from two or more symbols. The basic ingredients are a 

set of theses T, a set of antitheses A, and an operator Sy, among 

others, which yields a synthesis z for any t in T and some a in 

A. For all the dialectics listed by Gagnon (1980), it is not 

difficult to show that there exist sets of symbol strings T and A 

and operators such as Sy that when embedded into the deductive-

world model become sets of ultra-theses, ultra-antitheses and, an 

ultra-mental process, the ultra-synthesis operator *Sy (Herrmann, 

1992). Once again, the same type of conclusions hold for these 

ultra-dialectics as holds for the ultra-logic D.



It appears that all forms of such mental-like processes are 

improved upon, to an extreme degree, by their corresponding ultra-

mental processes. When the collection UM of ultra-mental 

processes is compared, as a whole, with the corresponding set M 

of mental processes that are displayed by humanity, then it 

appears reasonable to characterize the collection UM as 

representing a higher intelligence. The logical existence of UM 

is obtained by use of the most fundamental tool of modern science 

and establishes that the acceptance of the existence of a 

supernatural higher intelligence is scientifically rational and 

verifies the conclusions discussed in the introduction to this 

paper. Moreover, any properly stated model MH that either 

specifically utilizes such a postulate or logically implies the 

existence of a supernatural higher intelligence cannot be 

rejected as somehow or other not being scientific in character. 

Indeed, if such a model MH explains past natural events or human 

experiences, and predicts other events as they are observed 

today, then the scientific method explicitly states that such 

models are to be considered as good as or even better than other 

models.



Although this discussion could be concluded at this point, one 

interesting question is suggested. Has such a higher intelligence 

been previously described using terms and concepts that parallel 

those for the above ultra-mental processes?



*Significance of Results*



Although a comparison with the doctrine of all of the major 

religious belief-systems has not been made, there does exist a 

strong correlation between these results and statements that 

appear in the Jewish and Christian Bibles. The Bible, when 

literally interpreted, often describes God's attributes in terms 

of a linguistic or a mental model. This is especially the case 

when the mind of God is compared to the mind of man. In every 

single case, the ``mind of God'' Scriptural statements are 

modeled by the above special deductive-world interpretations. 

This is a startling fact since the deductive-world model was not 

created originally for application to theological concepts.



As examples, every time the Scriptures state that God ``speaks'' 

to a prophet, or a Jew or Christian then the above special 

interpretation is verified. Indeed, all statements that compare 

God's wisdom, intelligence and the like with that of humanity are 

satisfied by this special interpretation as are numerous 

statements relative to the supernatural means that God employs to 

communicate with an individual.



Here is a partial list of such statements. Genesis 1:26; Numbers 

23:19; Deuteronomy 33:26; 1 Kings 8:23, 27; 2 Chronicles 2:5; Job 

9:4, 10, 11:7, 8, 12:13, 15:8, 28:12--13, 20--24, 32:8, 33:12, 

14, 37:23, 38:33, 36; Psalm 35:10, 53:2, 77:13, 86:5, 93:5, 

94:11, 119:27, 99, 100, 139:2, 6, 17--18, 147:5; Proverbs 2:6: 

Ecclesiastes 2:26, 3:11, 8:17; Isaiah 55:8--9; Jeremiah 10:10--

13, 17:10, 31:10; Daniel 2:21--22, 46; Matthew 10:20; Mark 13:12, 

13; Luke 6:8, 10:21, 22, 21:15, 24:45: John 8:47, 10:16, 27, 

12:40, 14:26; Romans 11:33--34; 1 Corinthians 1:10, 19--20; 2:10, 

13, 16; 2 Corinthians 10:4; Ephesians 1:17; Colossians 2:3, 4; 2 

Timothy 2:7; James 1:5.



Even if not specifically related to doctrinal statements, the 

logical existence of a supernatural higher intelligence is 

obviously significant for any supernaturally related belief-

system and modern creation-science. It is no long advisable to  

categorize human religious experiences and scientific models that 

are associated with a supernatural higher intelligence as being 

somehow or other irrational in character. Indeed, if such 

experiences or creation-science models directly correlate to a 

literal Bible interpretation, then the assumption of 

irrationality can be scientifically proved to be false. Finally, 

since application of the basic tool used for modern scientific 

research has established that it is  scientific to assume the 

existence of a supernatural higher intelligence, a properly 

constituted creation-science model that relies upon this 

assumption is not ``pseudoscience'' as has been claimed. Note 

once again that if such a model increases our capacity to 

understand the workings of the natural realm, then the scientific 

method specifically states that such a model is the preferred 

model.



*End-notes*



1. Mathematically the purely subtle consequence operator C1 on 

all of the internal subsets of *P is D. See Herrmann (1987), 

Theorem 4.5.



2. This comes from the fact that the formalized first-order 

theory of the propositional calculus is an infinite set and as 

such when embedded into the D-world model this metatheory 

generates infinitely many incomprehensible statements that behave 

like logical rules for the ultra-logic D.



*References*



Eysenck, H. J. 1973. In: The humanist alternative, some 

definitions of humanism. ed. P. Kurtz,  Prometheus Books. 

Buffalo.



Ferris, T. 1970. The red limit. Bantam Books. New York.



Feuerbach, L. 1967.  Lectures on the essence of religion. 

Translated by R. Manheim. Harper & Row. New York.



Gagnon, L. S. 1980. Three theories of dialectic. Notre Dame 

Journal of Formal Logic. XXI(2):316--318.



Herrmann, R. A. 1981. Mathematical philosophy. Abstracts American 

Mathematical Society. 2(6):527.



Herrmann, R. A. 1987. Nonstandard consequence operators. Kobe 

Journal of Mathematics. 4(1):1--14.



Herrmann, R. A. 1991. Ultralogics and more. Institute for 

Mathematics and Philosophy, P. O. Box 3268, Annapolis, MD 21403-

0268.



Herrmann, R. A. 1992. Ultra-dialectics. Institute for Mathematics 

and Philosophy, P. O. Box 3268, Annapolis, MD 21403-0268.



Marx, K.  and F. Engles. 1960. On religion. Translated by the the 

Institute of Marxism-Leninism. Foreign Languages Publishing 

House. Moscow.



Santayana, G. 1905. Reason in religion. Charles Scribner's & 

Sons. New York.



Tarski, A. 1930. "Uber einige fundamentale begriffe der 

metamathematik. Comptes Rendus de seaces de la Spciete des 

Sciences et des Lettres de Varsovie. 23 cl. iii:22--29.



Wilder-Smith, A. E. 1993. The origin of conceptual thought in 

living systems. Impact # 236. Institute for Creation Science, El 

Cajon, CA.



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