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1

Digitale Medien

A model of the spatial-temporal characteristics of the alpha rhythm (1982)

Rotterdam, A. ; Lopes da Silva, F. H. ; Ende, J. ; [weitere]

Springer

Bulletin of mathematical biology 44 (1982), S. 283-305

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ISSN: 1522-9602

Quelle: Springer Online Journal Archives 1860-2000

Thema: Biologie , Mathematik

Notizen: Abstract A linear spatially distributed model of a chain of neurons and interneurons was investigated in relation to the generation of propagated alpha rhythmic activity. It was assumed that the elements of the chain were interconnected by means of recurrent collaterals and inhibitory fibres in such a way that the connectivity functions were assumed to be homogeneous and their strength was an exponentially decreasing function of distance. It was found that such a neuronal chain shows propagation properties for frequencies in the alpha band. The results obtained with the model are in agreement with the phase velocities encountered experimentally. In this way, it was possible to estimate the length of the neural fibres responsible for the phenomenon of propagated activity. The estimates obtained are in good agreement with recent quantitative neuroanatomical data on the circuitry of the neocortex.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF02463252

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2

Digitale Medien

Cartesian differential invariants in scale-space (1993)

Florack, L. M. J. ; Haar Romeny, B. M. ; Koenderink, J. J. ; [weitere]

Springer

Journal of mathematical imaging and vision 3 (1993), S. 327-348

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ISSN: 1573-7683

Schlagwort(e): Cartesian differential invariants ; Cartesian tensors ; irreducible invariants ; Gaussian scale-space ; local image structure

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik

Notizen: Abstract We present a formalism for studying local image structure in a systematic, coordinate-independent, and robust way, based on scale-space theory, tensor calculus, and the theory of invariants. We concentrate ondifferential invariants. The formalism is of general applicability to the analysis of grey-tone images of various modalities, defined on aD-dimensional spatial domain. We propose a “diagrammar” of differential invariants and tensors, i.e., a diagrammatic representation of image derivatives in scale-space together with a set of simple rules for representing meaningful local image properties. All local image properties on a given level of inner scale can be represented in terms of such diagrams, and, vice versa, all diagrams represent coordinate-independent combinations of image derivatives, i.e., true image properties. We presentcomplete andirreducible sets of (nonpolynomial) differential invariants appropriate for the description of local image structure up to any desired order. Any differential invariant can be expressed in terms ofpolynomial invariants, pictorially represented by closed diagrams. Here we consider a complete, irreducible set of polynomial invariants up to second order (inclusive). Examples of differential invariants up to fourth order (inclusive), calculated for synthetic, noiseperturbed, 2-dimensional test images, are included to illustrate the main theory.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01664793

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3

Digitale Medien

General intensity transformations and differential invariants (1994)

Florack, L. M. J. ; Haar Romeny, B. M. ; Koenderink, J. J. ; [weitere]

Springer

Journal of mathematical imaging and vision 4 (1994), S. 171-187

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ISSN: 1573-7683

Schlagwort(e): local gray-value invariants ; Cartesian tensors ; local isophote structure

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik

Notizen: Abstract We consider the group of invertible image gray-value transformations and propose a generating equation for a complete set of differential gray-value invariants up to any order. Such invariants describe the image's geometrical structure independent of how its gray-values are mapped (contrast or brightness adjustments).

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01249895

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4

Digitale Medien

Linear scale-space (1994)

Florack, L. M. J. ; Haar Romeny, B. M. ; Koenderink, J. J. ; [weitere]

Springer

Journal of mathematical imaging and vision 4 (1994), S. 325-351

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ISSN: 1573-7683

Schlagwort(e): scaled differential operators ; front-end vision ; Gaussian family ; local jet bundle ; scale invariance ; scale-space

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik

Notizen: Abstract The formulation of afront-end or“early vision” system is addressed, and its connection with scale-space is shown. A front-end vision system is designed to establish a convenient format of some sampled scalar field, which is suited for postprocessing by various dedicated routines. The emphasis is on the motivations and implications of symmetries of the environment; they pose natural, a priori constraints on the design of a front-end. The focus is on static images, defined on a multidimensional spatial domain, for which it is assumed that there are no a priori preferred points, directions, or scales. In addition, the front-end is required to be linear. These requirements are independent of any particular image geometry and express the front-end's pure syntactical, “bottom up” nature. It is shown that these symmetries suffice to establish the functionality properties of a front-end. For each location in the visual field and each inner scale it comprises a hierarchical family of tensorial apertures, known as the Gaussian family, the lowest order of which is the normalised Gaussian. The family can be truncated at any given order in a consistent way. The resulting set constitutes a basis for alocal jet bundle. Note that scale-space theory shows up here without any call upon the “prohibition of spurious detail”, which, in some way or another, usually forms the basic starting point for “diffusion-like” scale-space theories.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01262401

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5

Digitale Medien

A two-dimensional model for the cochlea (1975)

Viergever, M. A. ; Kalker, J. J.

Springer

Journal of engineering mathematics 9 (1975), S. 353-365

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ISSN: 1573-2703

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik , Technik allgemein

Notizen: Summary A two-dimensional model for the cochlea is developed. An integral equation is derived that describes the pressure difference between the scalae. For the main quantity, the transmembrane pressure, an ordinary differential equation is obtained, which appears to be an improvement of the well-known Peterson-Bogert equation. The results are valid for all frequencies; an assumption of long or short wavelengths is not necessary at all.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01540672

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6

Digitale Medien

Localization of non-linearities in the cochlea (1975)

Viergever, M. A. ; Kalker, J. J.

Springer

Journal of engineering mathematics 9 (1975), S. 11-20

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ISSN: 1573-2703

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik , Technik allgemein

Notizen: Summary An attempt is made to locate the non-linear sources inside the cochlea. The possible sources can be divided in several classes: of no significance are the perilymph, the endolymph and the impedances of Reissner's membrane and the basilar membrane; of little significance is the motion of the mentioned membranes in their own plane; of uncertain significance are the oval window impedance and the spiral coiling of the cochlea, while the mechanism of tectorial membrane, haircells and organ of Corti is likely to be an important source of non-linearity. Moreover the widely used membrane equation is improved in the course of the work.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01535493

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7

Digitale Medien

A two-dimensional model for the cochlea (1977)

Viergever, M. A.

Springer

Journal of engineering mathematics 11 (1977), S. 11-28

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ISSN: 1573-2703

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik , Technik allgemein

Notizen: Summary An alternative is given for the approach of the two-dimensional problem presented in [12]. Because of the mathematical simplicity of this alternative, several extensions of the model are possible. In this work the compressibility of the perilymph and variations of the scalaheight are considered; other extensions are briefly discussed. The numerical calculations lead to the following conclusions: (1) the results of the one- and two-dimensional models show large quantitative but hardly any qualitative differences; (2) Von Békésy's [1] conclusions concerning the influence of the scalaheight upon the motion of the partition are incorrect; (3) the quantitative discrepancies between the model's results and the experiments of Rhode [6] can be eliminated by a large reduction of the scalaheight; (4) the phase difference as a function of frequency and the phase velocity show no qualitative disparities with the experimental data; (5) models with few sections, such as the hybrid computer model of Hubbard and Geisler [4] are inaccurate.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01535585

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8

Digitale Medien

On the adequacy of the Peterson-Bogert model and on the effects of viscosity in cochlear dynamics (1974)

Viergever, M. A. ; Kalker, J. J.

Springer

Journal of engineering mathematics 8 (1974), S. 149-156

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ISSN: 1573-2703

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik , Technik allgemein

Notizen: Summary Based on a simplified model of the cochlea a one-dimensional approach (the Peterson-Bogert model) is compared with a three-dimensional one. The results appear to be in agreement provided the impedance of the partition is large. This is true for low frequencies except in the region of maximum membrane amplitude. For low frequencies, moreover, the fluid can be considered as incompressible. The influence of the viscosity is investigated by localizing the entire viscous force in a boundary layer. This layer is shown to occur in the fluid. Besides it is concluded that the rotation is approximately largest where the membrane has its maximum amplitude. This can be an explanation for the appearance of eddies at that point.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF02353617

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