[Albertella A., Migliaccio F. and Sansò F. (2002) GOCE: The Earth Field by Space Gradiometry. Celestial Mechanics and Dynamic Astronomy, Vol. 83, 1-15.10.1023/A:1020104624752]Search in Google Scholar
[Balmino G., Perosanz F., Rummel R., Sneeuw N., Sünkel H. and Woodworth P. (1998) European Views on Dedicated Gravity Field Missions: GRACE and GOCE. An Earth Sciences Division Consultation Document, ESA, ESD-MAG-REP-CON-001.]Search in Google Scholar
[Balmino G., Perosanz F., Rummel R., Sneeuw N. and Suenkel H. (2001) CHAMP, GRACE and GOCE: Mission Concepts and Simulations. Bollettino di Geofisica Teorica ed Applicata, Vol. 40, No. 3-4, 309-320.]Search in Google Scholar
[Bouman J. and Koop R. (2003) Error assessment of GOCE SGG data using along track interpolation, Advances in Geosciences, Vol. 1, 27-32.]Search in Google Scholar
[Bouman J., Koop R., Haagmans R., Mueller J., Sneeuw N. Tscherning C.C. and Visser P. (2003) Calibration and validation of GOCE gravity gradients, Paper presented at IUGG meeting, pp. 1-6]Search in Google Scholar
[Bouman J., Koop R., Tscherning C.C. and Visser P. (2004) Calibration of GOCE SGG data using high-low STT, terrestrial gravity data and global gravity field models, Journal of Geodesy, Vol. 78, 124-137.]Search in Google Scholar
[Chen J. Y. (1982) Methods for computing deflections of the vertical by modifying Vening-Meinesz' function, Bulletin Geod aesique, Vol. 56, 9-26.]Search in Google Scholar
[Denker H. (2002) Computation of gravity gradients for Europe for calibration/validation of GOCE data, In Proc. IAG International symposium "Gravity and Geoid" Tziavos I.N. (ed.) Aug. 26-30, 2002, Thessaloniki, Greece, p.287-292.]Search in Google Scholar
[Ellmann A. (2004) The geoid for the Baltic countries determined by the least squares modification of Stokes' formula, Doctoral thesis in Geodesy, Royal Institute of Technology, Stockholm, Sweden.]Search in Google Scholar
[Ellmann A. (2005) Computation of three stochastic modification of Stokes' formula for regional geoid determination, Computers & Geos cienecs, Vol. 31, 742-755.]Search in Google Scholar
[ESA (1999) Gravity Field and Steady-State Ocean Circulation Mission, ESA SP-1233(1), Report for mission selection of the four candidate earth explorer missions. ESA Publications Division, pp. 217, July 1999.]Search in Google Scholar
[Eshagh M. (2009a) On satellite gravity gradiometry, Doctoral dissertation in Geodesy, Royal Institute of Technology (KTH), Stockholm, Sweden]Search in Google Scholar
[Eshagh M. (2009b) Alternative expressions for gravity gradients in local-north oriented frame and tensor spherical harmonics, Acta Geophysica, Vol. 58, 215-243.10.2478/s11600-009-0048-z]Search in Google Scholar
[Eshagh M. (2009c) Least-squares modification of Stokes' formula with EGM08, Geodesy & Cartography, Vol. 35, No. 4, 111-117.10.3846/1392-1541.2009.35.111-117]Search in Google Scholar
[Eshagh M. (2009d) Spherical harmonic expansion of the atmospheric gravitational potential based on exponential and power models of atmosphere, Artificial Satellites, Vol. 43, 25-43.10.2478/v10018-009-0005-8]Search in Google Scholar
[Eshagh M. (2009e) Contribution of 1st-3rd order terms of a binomial expansion of topographic heights in topographic and atmospheric effects on satellite gravity gradiometric data, Artificial Satellites, Vol. 44, 21-31.10.2478/v10018-009-0016-5]Search in Google Scholar
[Eshagh M. (2009f) Complementary studies in Satellite Gravity Gradiometry, Postdoctoral report in Geodesy, TRITA-TEC-RR 09-006, Royal Institute of Technology (KTH), Stockholm, Sweden.]Search in Google Scholar
[Eshagh M. (2010a) Least-squares modification of extended Stokes' formula and its second-order radial derivative for validation of satellite gravity gradiometry data, Journal of Geodynamics, Vol. 49, 92-104.10.1016/j.jog.2009.11.003]Search in Google Scholar
[Eshagh M. (2010b) Semi-stochastic modification of second-order radial derivative of Abel-Poisson formula for generating satellite gravity gradiometry data, Advances in Space Research (Submitted).10.1016/j.asr.2010.10.003]Search in Google Scholar
[Eshagh M. (2010c) On the convergence of spherical harmonic expansion of topographic and atmospheric biases in gradiometry, Contributions in Geophysics and Geodesy, Vol. 39, 273-299.10.2478/v10126-009-0010-8]Search in Google Scholar
[Eshagh M. and Sjöberg L.E. (2008) Impact of topographic and atmospheric masses over Iran on validation and inversion of GOCE gradiometric data, Journal of the Earth & Space Physics, Vol. 34, 15-30.]Search in Google Scholar
[Eshagh M. and Sjöberg L.E. (2009a) Topographic and atmospheric effects on GOCE gradiometric data in a local north-oriented frame: A case study in Fennoscandia and Iran, Studia Geophysica et Geodaetica, Vol. 53, 61-80.10.1007/s11200-009-0004-z]Search in Google Scholar
[Eshagh M. and Sjöberg L.E. (2009b) Atmospheric effect on satellite gravity gradiometry data, Journal of Geodynamics, Vol. 47, 9-19.10.1016/j.jog.2008.06.001]Search in Google Scholar
[Haagmans R. Prijatna K. and Omang O. (2002) An alternative concept for validation of GOCE gradiometry results based on regional gravity, In Proc. Gravity and Geoid 2002, GG2002, August 26-30, Thessaloniki, Greece.]Search in Google Scholar
[Hagiwara Y. (1972) Truncation error formulas for the geoidal height and the deflection of the vertical, Bulletin Geod aesique, Vol. 106, 453-466.]Search in Google Scholar
[Heiskanen W. and Moritz H. (1967) Physical Geodesy. W.H Freeman and company, San Francisco and London.10.1007/BF02525647]Search in Google Scholar
[Hsu H.T. (1984) Kernel function approximation of Stokes' integral, In Proc. Local gravity field approximation (Ed. Schwarz P.K.), Aug. 21-Sep. 4, 1984, Beijing, China.]Search in Google Scholar
[Hwang C. (1995) A method for computing the coefficients in the product-sum formula of associated Legendre functions, Journal of Geodesy, Vol. 70, 110-116.]Search in Google Scholar
[Hwang C. (1998) Inverse Vening Meinesz formula and deflection-geoid formula: application to the prediction of gravity and geoid over the South China Sea, Journal of Geodesy, Vol. 72, 304-312.]Search in Google Scholar
[Kern M. and Haagmans R. (2004) Determination of gravity gradients from terrestrial gravity data for calibration and validation of gradiometric GOCE data, In Proc. Gravity, Geoid and Space missions, GGSM 2004, IAG International symposium, Portugal, August 30- September 3, pp. 95-100.]Search in Google Scholar
[Kern M., Preimesberger T., Allesch M., Pail. R., Bouman J. and Koop R. (2005) Outlier detection algorithms and their performance in GOCE gravity field processing, Journal of Geodesy, Vol. 78, 509-519.]Search in Google Scholar
[Mainville A. (1986) The altimetry-gravimetry problem using orthonormal base functions, Department of geodetic science and surveying, Report No. 373, 203 pp. The Ohio State University, Columbus.]Search in Google Scholar
[Molodensky M.S., Eremeev V.F. and Yurkina M.I. (1962) Methods for study of the external gravity field and figure of the Earth. Translated from Russian (1960), Israel program for scientific translation, Jerusalem.]Search in Google Scholar
[Mueller J. (2003) GOCE gradients in various reference frames and their accuracies, Advances in Geosciences, Vol. 1, 33-38.]Search in Google Scholar
[Mueller J., Denker H., Jarecki F. and Wolf K.I. (2004) Computation of calibration gradients and methods for in-orbit validation of gradiometric GOCE data, In Proc. Second international GOCE user workshop "Goce, The Geoid and Oceanography", ESA-ESRIN, Frascati, Italy, 8-10 March 2004.]Search in Google Scholar
[Neyman Yu. M. Li J. and Liu Q. (1996) Modification of Stokes and Vening-Meinesz formulas for the inner zone of arbitrary shape by minimization of upper bound truncation errors, Journal of Geodesy, Vol. 70, 410-418.]Search in Google Scholar
[Pail R. (2003) Local gravity field continuation for the purpose of in-orbit calibration of GOCE SGG observations, Advances in Geosciences, Vol. 1, 11-18]Search in Google Scholar
[Paul M.K. (1973) A method of evaluating the truncation error coefficients for geoidal height, Bulletin Geod aesique, Vol. 110, 413-425.]Search in Google Scholar
[Pavlis N.K. and Holmes S.A. (2006) A preliminary earth gravitational model to degree 2160, Paper presented at the IAG International Symposium on Gravity, Geoid and Space Missions 2004, GGSM2004, Porto, Portugal August 30 - September 3, 2004]Search in Google Scholar
[Petrovskaya M.S. and Vershkov A.N. (2006) Non-singular expressions for the gravity gradients in the local north-oriented and orbital reference frames, Journal of Geodesy, Vol. 80, 117-127.]Search in Google Scholar
[Reed G.B. (1973) Application of kinematical geodesy for determining the shorts wavelength component of the gravity field by satellite gradiometry, Ohio state University, Dept. of Geod Science, Rep. No. 201, Columbus, Ohio.]Search in Google Scholar
[Sjöberg L.E. (1980) Least-squares combination of satellite harmonics and integral formulas in physical geodesy, Gerlands Beitr. Geophysik Leipzig, Vol. 89, No. 5, 371-377.]Search in Google Scholar
[Sjöberg L.E. (1981) Least-squares combination of terrestrial and satellite data in physical geodesy, Annual Geophysics, Vol. 37, 25-30.]Search in Google Scholar
[Sjöberg L.E. (1984a) Least-Squares modification of Stokes' and Vening-Meinez' formula by accounting for truncation and potential coefficients errors. Manuscripta Geodaetica, Vol. 9:209-229.]Search in Google Scholar
[Sjöberg L.E. (1984b) Least- squares modification of Stokes' and Vening Meinesz' formulas by accounting for errors of truncation, potential coefficients and gravity data, Report No. 27, Department of Geodesy, Uppsala.]Search in Google Scholar
[Sjöberg L.E. (1991) Refined least-squares modification of Stokes' formula, Manuscripta Geodaetica, Vol. 16, 367-375.]Search in Google Scholar
[Sjöberg L.E. (2003) A general model for modifying Stokes' formula and its leastsquares solution, Journal of Geodesy, Vol. 77, 459-464.]Search in Google Scholar
[Tóth G., Földváry L., Tziavos I. and Adam J. (2004) Upward/downward continuation of gravity gradients for precise geoid determination, Proc. Second International GOCE user workshop "GOCE, The Geoid and Oceanography", ESA-ESRIN, Frascati, Italy, 8-10 March 2004.]Search in Google Scholar
[Tóth G., Földváry L., Tziavos I. and Adam J. (2006) Upward/downward continuation of gravity gradients for precise geoid determination, Acta Geodaetica Geophysica Hungarica, Vol. 41, 21-30.]Search in Google Scholar
[Tóth G., Földváry L. and Tziavos I. N. (2007) Practical aspects of upward/downward continuation of gravity gradients, In proc. "The 3rd International GOCE user workshop", ESA-ESRIN, Frascati, Italy, 6-8 Nov. 2006 (ESA SP-627, January 2007).]Search in Google Scholar
[Tscherning C.C. and Rapp R. (1974) Closed covariance expressions for gravity anomalies, geoid undulations and deflections of vertical implied by anomaly degree variance models. Rep. 355. Dept. Geod. Sci. Ohio State University, Columbus, USA.]Search in Google Scholar
[Tscherning C.C., Veicherts M. and Arabelos D. (2006) Calibration of GOCE gravity gradient data using smooth ground gravity, In Proc. GOCINA workshop, Cahiers de center European de Geodynamique et de seismilogie, Vol. 25, pp. 63-67, Luxenburg.]Search in Google Scholar
[Tziavos I.N. and Andritsanos V.D. (1998) Improvement in the computation of deflection of the vertical by FFT, Physics and Chemistry of the Earth, Vol. 23, 71-75.]Search in Google Scholar
[Wenzel H.G. (1981) Zur Geoidbestimmung durch kombination von schwereanomalien und einem kugelfuncationsmodell mit hilfe von integralformeln. Zeitschrift fur Geodasie, Geoinformation und Landmanagement, Vol. 106, No. 3, 102-111.]Search in Google Scholar
[Wolf K. I. (2007) Kombination globaler potentialmodelle mit terresrischen schweredaten fur die berechnung der zweiten ableitungen des gravitationspotentials in satellitenbahnhohe, PhD thesis, University of Hannover, Germany.]Search in Google Scholar
[Zielinsky J.B. and Petrovskaya M.S. (2003) The possibility of the calibration/validation of the GOCE data with the balloon-borne gradiometer, Advances in Geosciences, Vol. 1, 149-153.]Search in Google Scholar
[Ågren J. (2004) Regional geoid determination methods for the era of satellite gravimetry, Numerical investigations using synthetic Earth gravity models, Doctoral thesis in Geodesy, Royal Institute of Technology, Stockholm, Sweden.]Search in Google Scholar