Essay on the theory of who is God, the matrix particle and quantum stamens: in the formation of everything and the universe

Given that God is nothing absolute, the only eternally present, immutable and neutral element of any equation that can contain everything we can understand as dimensions, particles, waves, matter, energy, life; where without this force the universe and the reverse could never happen, being a single-hand, undeniable pathway, this essay aims to deal with considerations related to the God particle, as well as describe this particle, here baptized as Matrix Particle and Quantum Stamens (PM and EQ), about its behavior in space, which is intrinsic to the understanding of its existence. This theory is based on own observations and bibliographies already published based on studies on the understanding of what is the greater God and the demigods or galactic Gods, including an analogy of how the universes contain the god endorsed and other of lesser power energy, among other studies related to the theme that deal with the most basic particle to make up the universe, both in its matter, as forms of energy and even predicting the existence of antimatter. Thus, for better compression, I describe within this larger structure called “God”, which is where there are the fundamental particles, composed of six basic elements that we call in this function as “Quantum Stumers”, and an energetic particle with its own light that we call “Matrix Particle” because it is mainly the light of the universe, where without this radiant energy there is no motor life, which is what interests us. That said, in a few words, the results revealed that if the concepts of pmeeq’s form and performance are widely studied and understood, these data will enable an advance in terms of energy use, fuel production and even material transport.

On the Theory of Left/Right Almost Groups and Hypergroups with their Relevant Enumerations

This paper presents the study of algebraic structures equipped with the inverted associativity axiom. Initially, the definition of the left and the right almost-groups is introduced and afterwards, the study is focused on the more general structures, which are the left and the right almost-hypergroups and on their enumeration in the cases of order 2 and 3. The outcomes of these enumerations compared with the corresponding in the hypergroups reveal interesting results. Next, fundamental properties of the left and right almost-hypergroups are proved. Subsequently, the almost hypergroups are enriched with more axioms, like the transposition axiom and the weak commutativity. This creates new hypercompositional structures, such as the transposition left/right almost-hypergroups, the left/right almost commutative hypergroups, the join left/right almost hypergroups, etc. The algebraic properties of these new structures are analyzed and studied as well. Especially, the existence of neutral elements leads to the separation of their elements into attractive and non-attractive ones. If the existence of the neutral element is accompanied with the existence of symmetric elements as well, then the fortified transposition left/right almost-hypergroups and the transposition polysymmetrical left/right almost-hypergroups come into being.

Threat learning impairs subsequent memory recombination with past episodes

To successfully predict important events, the representations in memory on which we rely need to be constantly updated and transformed to best reflect a complex and dynamic world. Here we employed a novel paradigm to investigate how memories of threat learning affect the flexible recombination across distinct but overlapping experiences, an ability referred to as relational memory. Participants (n=35) visited the lab to first encode neutral associations (A - B), which were reactivated and predictively associated with a new aversive or neutral element (B - C) on the following day, whilst pupil dilation was measured as an index of arousal. Then, again one day later, the accuracy of relational memory judgements (A - C?) was tested. Novel association to threat was found to impair relational memory. Unexpectedly, this effect was not moderated by arousal. We propose that compartmentalization of threat learning events could be a function of a healthy memory, preventing maladaptive ‘episodic overgeneralization’ of threat to previously encoded episodes.

Zero morphemes in paradigms

This paper sheds a new light on the notion of zero morphemes in inflectional paradigms: on their formal definition (§ 1), on the way of counting them (§ 2–3) and on the way of conceptualizing them at a deeper, mathematical level (§ 4). We define (zero) morphemes in the language of cartesian set products and propose a method of counting them that applies the lexical relations of homophony, polysemy, allomorphy and synonymy to inflectional paradigms (§ 2). In this line, two homophonic or synonymous morphemes are different morphemes, while two polysemous and allomorphic morphemes count as one morpheme (§ 3). In analogy to the number zero in mathematics, zero morphemes can be thought of either as minimal elements in a totally ordered set or as neutral element in a set of opposites (§ 4). Implications for language acquisition are discussed in the conclusion (§ 5).

Polski sukces sukcesu w świetle opracowań leksykograficznych i literatury popularnopsychologicznej

In her article the author discusses “success” – one of most important words defining the contemporary culture and people. She asks about the meaning of the word and compares its use in self-help books with the definition found in dictionaries of the Polish language. How is the contemporary “culture of success” created by those “new” meaning profiles? The first part of the analysis concerns the semantics of “success” in selected historical and modern dictionaries. K. Skowronek points out that the word has undergone the process of amelioration: from a neutral element to a positive one. The second part of the article is a narrative analysis. The author presents the semantics of the word in contemporary self-help books. She highlights its individualistic and self-disciplining character. Nowadays, success is synonymous with happiness and the meaning of life. It predominantly entails an obsessive chase while not necessarily a real achievement.

Study on the Algebraic Structure of Refined Neutrosophic Numbers

This paper aims to explore the algebra structure of refined neutrosophic numbers. Firstly, the algebra structure of neutrosophic quadruple numbers on a general field is studied. Secondly, The addition operator ⊕ and multiplication operator ⊗ on refined neutrosophic numbers are proposed and the algebra structure is discussed. We reveal that the set of neutrosophic refined numbers with an additive operation is an abelian group and the set of neutrosophic refined numbers with a multiplication operation is a neutrosophic extended triplet group. Moreover, algorithms for solving the neutral element and opposite elements of each refined neutrosophic number are given.

Neutrosophic Extended Triplet Group Based on Neutrosophic Quadruple Numbers

In this paper, we explore the algebra structure based on neutrosophic quadruple numbers. Moreover, two kinds of degradation algebra systems of neutrosophic quadruple numbers are introduced. In particular, the following results are strictly proved: (1) the set of neutrosophic quadruple numbers with a multiplication operation is a neutrosophic extended triplet group; (2) the neutral element of each neutrosophic quadruple number is unique and there are only sixteen different neutral elements in all of neutrosophic quadruple numbers; (3) the set which has same neutral element is closed with respect to the multiplication operator; (4) the union of the set which has same neutral element is a partition of four-dimensional space.

On Neutrosophic Triplet Groups: Basic Properties, NT-Subgroups, and Some Notes

As a new generalization of the notion of the standard group, the notion of the neutrosophic triplet group (NTG) is derived from the basic idea of the neutrosophic set and can be regarded as a mathematical structure describing generalized symmetry. In this paper, the properties and structural features of NTG are studied in depth by using theoretical analysis and software calculations (in fact, some important examples in the paper are calculated and verified by mathematics software, but the related programs are omitted). The main results are obtained as follows: (1) by constructing counterexamples, some mistakes in the some literatures are pointed out; (2) some new properties of NTGs are obtained, and it is proved that every element has unique neutral element in any neutrosophic triplet group; (3) the notions of NT-subgroups, strong NT-subgroups, and weak commutative neutrosophic triplet groups (WCNTGs) are introduced, the quotient structures are constructed by strong NT-subgroups, and a homomorphism theorem is proved in weak commutative neutrosophic triplet groups.

An Extension of Semiuninorms: Weak-Neutral Semiuninorms

By weakening the neutral element condition of semiuninorms, we introduce a new concept called weak-neutral semiuninorms (shortly, wn-semiuninorms). After analyzing their structure, several classes of wn-semiuninorms are presented and discussed. Particularly, based on a kind of monotone unary functions which are not necessarily continuous and strictly monotone, we introduce representable wn-semiuninorms and discuss some of their properties in detail. We show that there is no idempotent proper wn-semiuninorm. Each representable wn-semiuninorm is Archimidean but not strictly monotone, and its additive generator is unique up to a positive multiplicative constant under some conditions. In the discussion about the representable wn-semiuninorms, we also characterize the solutions to a class of Cauchy functional equations on a restricted domain.