Results 1 to 10 of about 1,844,621 (145)
Transactions of the American Mathematical Society, 1938 Let \(R\) be any commutative ring with unity, and let \(L\) be the lattice of the ideals of \(R\). It is known that \(L\) is a modular lattice. The authors announce further conditions on \(L\); for example, if \(L\) is complemented, then it is a Boolean algebra -- thus it cannot be a non-trivial projective geometry.
Ward, Morgan, Dilworth, R. P.
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Journal of the European Economic Association, 2018 AbstractSuccesses of law enforcement in apprehending offenders are often publicized events. Such events have been found to result in temporary reductions in offending, or “residual deterrence”. We provide a theory of residual deterrence that accounts for the incentives of both enforcement officials and potential offenders.
Dilmé, Francesc, Garrett, Daniel F.
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Forecasting residue–residue contact prediction accuracy [PDF]
Bioinformatics, 2017 Abstract Motivation Apart from meta-predictors, most of today's methods for residue–residue contact prediction are based entirely on Direct Coupling Analysis (DCA) of correlated mutations in multiple sequence alignments (MSAs).
Wozniak, P.P. +5 more
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Journal of Empirical Finance, 2009 Conventional momentum strategies exhibit substantial time-varying exposures to the Fama and French factors. We show that these exposures can be reduced by ranking stocks on residual stock returns instead of total returns. As a consequence, residual momentum earns risk-adjusted profits that are about twice as large as those associated with total return ...
Blitz, D, Huij, Joop, Martens, MPE
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Residual Equisingularity [PDF]
Proceedings of the American Mathematical Society, 1976 Let V V be a complex analytic set and Sg V \operatorname {Sg} V the singular set of V V be in codimension one; then the set of points of Sg V \operatorname {Sg} V for which V V is not residually equisingular ...
Becker, Joseph, Stutz, John
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Products in Residue Classes [PDF]
, 2007 We consider a problem of P. Erdos, A. M. Odlyzko and A. Sarkozy about the representation of residue classes modulo m by products of two not too large primes.
E. Shparlinski +3 more
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Modern Physics Letters A, 1991 We discuss when and how the Verlinde dimensions of a rational conformal field theory can be expressed as correlation functions in a topological LG theory. It is seen that a necessary condition is that the RCFT fusion rules must exhibit an extra symmetry. We consider two particular perturbations of the Grassmannian superpotentials.
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From principal component to direct coupling analysis of coevolution in proteins: Low-eigenvalue modes are needed for structure prediction [PDF]
, 2013 Various approaches have explored the covariation of residues in multiple-sequence alignments of homologous proteins to extract functional and structural information. Among those are principal component analysis (PCA), which identifies the most correlated
Cocco, Simona +2 more
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Dual conformal constraints and infrared equations from global residue theorems in N=4 SYM theory [PDF]
, 2010 Infrared equations and dual conformal constraints arise as consistency conditions on loop amplitudes in N=4 super Yang-Mills theory. These conditions are linear relations between leading singularities, which can be computed in the Grassmannian ...
A Brandhuber +34 more
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Sequence composition and environment effects on residue fluctuations in protein structures [PDF]
, 2009 The spectrum and scale of fluctuations in protein structures affect the range of cell phenomena, including stability of protein structures or their fragments, allosteric transitions and energy transfer.
Anatoly M. Ruvinsky +2 more
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