Results 221 to 230 of about 240,776 (268)
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Topology and its Applications, 2020
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Mathematical Logic Quarterly, 1983
This paper summarizes present knowledge about degrees of analytic sets (Part 1) and contains proofs of several new structural results (Part 3). Most of the theorems about degrees of analytic sets require additional, often incompatible, set-theoretic axioms, such as the existence of sharps or the Axiom of Constructibility.
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This paper summarizes present knowledge about degrees of analytic sets (Part 1) and contains proofs of several new structural results (Part 3). Most of the theorems about degrees of analytic sets require additional, often incompatible, set-theoretic axioms, such as the existence of sharps or the Axiom of Constructibility.
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Journal of the American Psychoanalytic Association, 1994
In the context of viewing the analytic setting as a “clinical laboratory” to study the nature of love relations, this paper starts by outlining the relationships of transference love, “normal” love, neurotic love, and oedipal love. After a description of the vicissitudes of transference love when patient and analyst are of the same sex and of opposite
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In the context of viewing the analytic setting as a “clinical laboratory” to study the nature of love relations, this paper starts by outlining the relationships of transference love, “normal” love, neurotic love, and oedipal love. After a description of the vicissitudes of transference love when patient and analyst are of the same sex and of opposite
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Functional Analysis and Its Applications, 1997
The paper presents results of the algebraic dimension theory for exponential analytic sets, which, by definition are the set of common zeros of a finite number of entire functions each of which being of the form \[ \sum c_\lambda\exp\langle z,\lambda\rangle, \] where \(c_\lambda\in\mathbb{C}\) and \(\lambda\) runs over a finite subset \(\Lambda\) of ...
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The paper presents results of the algebraic dimension theory for exponential analytic sets, which, by definition are the set of common zeros of a finite number of entire functions each of which being of the form \[ \sum c_\lambda\exp\langle z,\lambda\rangle, \] where \(c_\lambda\in\mathbb{C}\) and \(\lambda\) runs over a finite subset \(\Lambda\) of ...
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2017
For any r ∈ (1, +∞), we denote by L r (ℝ + n+1 , y a ) the wheigted1 Lebesgue space, endowed with the norm $$ {{\left\| U \right\|}_{{{{L}^{r}}\left( {\mathbb{R}_{+}^{{n+1}},{{y}^{a}}} \right)}}}:={{\left( {{{\int }_{{\mathbb{R}_{+}^{{n+1}}}}}{{y}^{a}}{{{\left| U \right|}}^{r}}dX} \right)}^{{{{1} \left/ {r} \right.}}}}.
Serena Dipierro +2 more
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For any r ∈ (1, +∞), we denote by L r (ℝ + n+1 , y a ) the wheigted1 Lebesgue space, endowed with the norm $$ {{\left\| U \right\|}_{{{{L}^{r}}\left( {\mathbb{R}_{+}^{{n+1}},{{y}^{a}}} \right)}}}:={{\left( {{{\int }_{{\mathbb{R}_{+}^{{n+1}}}}}{{y}^{a}}{{{\left| U \right|}}^{r}}dX} \right)}^{{{{1} \left/ {r} \right.}}}}.
Serena Dipierro +2 more
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Algebra and Logic, 1997
Summary: We study complete valued algebraically closed fields in languages admitting integral analytic functions. It is shown that a nontrivial model theory of integral functions can be developed on the condition that a language is chosen suitably.
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Summary: We study complete valued algebraically closed fields in languages admitting integral analytic functions. It is shown that a nontrivial model theory of integral functions can be developed on the condition that a language is chosen suitably.
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Covering analytic sets by families of closed set
Journal of Symbolic Logic, 1994AbstractWe prove that for every familyIof closed subsets of a Polish space eachset can be covered by countably many members ofIor else contains a nonemptyset which cannot be covered by countably many members ofI. We prove an analogous result forκ-Souslin sets and show that ifA#exists for anyA⊂ωω, then the above result is true forsets.
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Mathematical Proceedings of the Cambridge Philosophical Society, 2005
For a Polish space \((X,d)\) and a continuous function \(f : X \to X\), say that \(x \in X\) attacks \(y \in X\) if for all positive integers \(m\) there is \(\ell \geq m\) with \(d (f^\ell (x) , y) < {1 \over m}\). \(\omega_f (x)\) is the set of points attacked by \(x\).
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For a Polish space \((X,d)\) and a continuous function \(f : X \to X\), say that \(x \in X\) attacks \(y \in X\) if for all positive integers \(m\) there is \(\ell \geq m\) with \(d (f^\ell (x) , y) < {1 \over m}\). \(\omega_f (x)\) is the set of points attacked by \(x\).
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