2,111 research outputs found
Theories without the tree property of the second kind
We initiate a systematic study of the class of theories without the tree
property of the second kind - NTP2. Most importantly, we show: the burden is
"sub-multiplicative" in arbitrary theories (in particular, if a theory has TP2
then there is a formula with a single variable witnessing this); NTP2 is
equivalent to the generalized Kim's lemma and to the boundedness of ist-weight;
the dp-rank of a type in an arbitrary theory is witnessed by mutually
indiscernible sequences of realizations of the type, after adding some
parameters - so the dp-rank of a 1-type in any theory is always witnessed by
sequences of singletons; in NTP2 theories, simple types are co-simple,
characterized by the co-independence theorem, and forking between the
realizations of a simple type and arbitrary elements satisfies full symmetry; a
Henselian valued field of characteristic (0,0) is NTP2 (strong, of finite
burden) if and only if the residue field is NTP2 (the residue field and the
value group are strong, of finite burden respectively), so in particular any
ultraproduct of p-adics is NTP2; adding a generic predicate to a geometric NTP2
theory preserves NTP2.Comment: 35 pages; v.3: a discussion and a Conjecture 2.7 on the
sub-additivity of burden had been added; Section 3.1 on the SOPn hierarchy
restricted to NTP2 theories had been added; Problem 7.13 had been updated;
numbering of theorems had been changed and some minor typos were fixed;
Annals of Pure and Applied Logic, accepte
Periodic waves in bimodal optical fibers
We consider coupled nonlinear Schrodinger equations (CNLSE) which govern the
propagation of nonlinear waves in bimodal optical fibers. The nonlinear
transform of a dual-frequency signal is used to generate an ultra-short-pulse
train. To predict the energy and width of pulses in the train, we derive three
new types of travelling periodic-wave solutions, using the Hirota bilinear
method. We also show that all the previously reported periodic wave solutions
of CNLSE can be derived in a systematic way, using the Hirota method.Comment: 10 pages with 2 figures. "Optics Communications, in press
Groups with the Minimal Conditions for Subgroups and for Nonabelian Subgroups
For some very wide classes and
of groups, the author proves that an
arbitrary (nonabelian) group (respectively ) satisfies the minimal condition for (nonabelian) subgroups iff
it is Cherniko
Mekler's construction and generalized stability
Mekler's construction gives an interpretation of any structure in a finite
relational language in a group (nilpotent of class and exponent , but
not finitely generated in general). Even though this construction is not a
bi-interpretation, it is known to preserve some model-theoretic tameness
properties of the original structure including stability and simplicity. We
demonstrate that -dependence of the theory is preserved, for all , and that NTP is preserved. We apply this result to obtain
first examples of strictly -dependent groups (with no additional structure).Comment: v.2 many minor corrections and presentation improvements throughout
the article, more details were added in some of the proofs; Remarks 2.12,
2.13 and Problem 5.8 are new; accepted to the Israel Journal of Mathematic
Externally definable sets and dependent pairs
We prove that externally definable sets in first order NIP theories have
honest definitions, giving a new proof of Shelah's expansion theorem. Also we
discuss a weak notion of stable embeddedness true in this context. Those
results are then used to prove a general theorem on dependent pairs, which in
particular answers a question of Baldwin and Benedikt on naming an
indiscernible sequence.Comment: 17 pages, some typos and mistakes corrected, overall presentation
improved, more details for the examples are give
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