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646
Dynamic programming algorithm optimization for spoken word recognition
 IEEE TRANSACTIONS ON ACOUSTICS, SPEECH, AND SIGNAL PROCESSING
, 1978
"... This paper reports on an optimum dynamic programming (DP) based timenormalization algorithm for spoken word recognition. First, a general principle of timenormalization is given using timewarping function. Then, two timenormalized distance definitions, ded symmetric and asymmetric forms, are der ..."
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defined common axis. Theoretical and experimental comparisons show that the symmetric form gives better recognition than the asymmetric one. Another problem discussed concerns slope constraint technique. Since too much of the warping function flexibility sometimes results in poor discrimination between
1. Semisymmetric Metric Connection
"... Abstract The object of this paper is to study invariant submanifolds M of Sasakian manifolds eM admitting a semisymmetric metric connection and to show that M admits semisymmetric metric connection. Further it is proved that the second fundamental forms σ and σ with respect to LeviCivita connecti ..."
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Abstract The object of this paper is to study invariant submanifolds M of Sasakian manifolds eM admitting a semisymmetric metric connection and to show that M admits semisymmetric metric connection. Further it is proved that the second fundamental forms σ and σ with respect to Levi
Spherically symmetric Finsler metrics in Rn
"... In this paper, we give the general form of spherically symmetric Finsler metrics in Rn and surprisedly find that many wellknown Finsler metrics belong to this class. Then we explicitly express projective metrics of this type. The necessary and sufficient conditions that projective Finsler metrics w ..."
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In this paper, we give the general form of spherically symmetric Finsler metrics in Rn and surprisedly find that many wellknown Finsler metrics belong to this class. Then we explicitly express projective metrics of this type. The necessary and sufficient conditions that projective Finsler metrics
Generalized Sasakian space forms with semisymmetric nonmetric connections
, 2011
"... Abstract. We introduce generalized Sasakian space forms with semisymmetric nonmetric connections. We show the existence of a generalized Sasakian space form with a semisymmetric nonmetric connection and give some examples by warped products endowed with semisymmetric nonmetric connections. ..."
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Abstract. We introduce generalized Sasakian space forms with semisymmetric nonmetric connections. We show the existence of a generalized Sasakian space form with a semisymmetric nonmetric connection and give some examples by warped products endowed with semisymmetric nonmetric connections.
The Projective Quarter Symmetric Metric Connections and Their Curvature Tensors
"... In this paper, the existence of the projective quarter symmetric metric connection is proved in Riemannian manifolds. In particular two cases, this connection reduces to a semisymmetric metric connection and to a projective semisymmetric connection. Furthermore, we study a scalar curvature of Rie ..."
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of Riemannian manifolds with keeping the covariant derivative of tensor W likj. Mathematics Subject Classification: 53A07, 53B25 Keywords:Projective quarter symmetric metric connection, The projective curvature tensor, 1form 1
Spherically Symmetric Metric Manifolds and the Black Hole Catastrophe
"... The usual interpretations of solutions for the gravitational field in a spherically symmetric Type I Einstein space contain mathematical anomalies. It is shown herein that the usual solutions must be modified to account for the intrinsic geometry associated with the relevant line elements, by which ..."
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Cited by 4 (3 self)
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, by which the geometrical relations between the components of the metric tensor are consequently invariant. A geometry is entirely determined by the form of the line element describing it. The usual solutions violate the intrinsic geometry of the associated line elements and are therefore inadmissible
Weakly φSymmetric Contact Metric Spaces
"... The examples, that we denote by Gw, given in [2] of contact metric spaces which are weakly locally φsymmetric, but not strongly, satisfy the stronger condition that their contact metric structure is homogeneous. In this paper we give the first example of weakly locally φsymmetric space which is no ..."
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The examples, that we denote by Gw, given in [2] of contact metric spaces which are weakly locally φsymmetric, but not strongly, satisfy the stronger condition that their contact metric structure is homogeneous. In this paper we give the first example of weakly locally φsymmetric space which
Integrated Contact Metric Manifold Admitting SemiSymmetric Metric SConnexion
"... In the present paper, we have defined integrated contact metric manifold admitting semisymmetric metric Sconnexion and the form of curvature tensor R of the manifold relative to this connexion has been derived. It has been shown that if integrated contact metric manifold admits a semisymmetric ..."
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In the present paper, we have defined integrated contact metric manifold admitting semisymmetric metric Sconnexion and the form of curvature tensor R of the manifold relative to this connexion has been derived. It has been shown that if integrated contact metric manifold admits a semisymmetric
Linearization of Moffat’s Symmetric Complex Metric Gravity
, 2009
"... ABSTRACT: In this paper we investigate a complex symmetric generalization of general relativity and in particular we investigate its linearized field equations. We begin by reviewing some basic definitions and structures in Moffat’s symmetric complex metric field theory of gravity. We then move on t ..."
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ABSTRACT: In this paper we investigate a complex symmetric generalization of general relativity and in particular we investigate its linearized field equations. We begin by reviewing some basic definitions and structures in Moffat’s symmetric complex metric field theory of gravity. We then move
Spherically Symmetric, Metrically Static, Isolated Systems in QuasiMetric Gravity by
, 2005
"... Working within the quasimetric framework (QMF) described elsewhere, we examine the gravitational field exterior respectively interior to a spherically symmetric, isolated body made of perfect fluid. By construction the system is “metrically static”, meaning that its associated gravitational field i ..."
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Working within the quasimetric framework (QMF) described elsewhere, we examine the gravitational field exterior respectively interior to a spherically symmetric, isolated body made of perfect fluid. By construction the system is “metrically static”, meaning that its associated gravitational field
Results 1  10
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646