Lecture 7 – More Gravity and GPS Processing GISC-3325 5 February 2009.

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Lecture 7 – More Gravity and GPS Processing GISC February 2009

Update Next class and lab will be on OPUS and GPS processing using OPUS. First exam on 12 February –Chapters 1-4 and all lectures and labs. –Will take place during Lab period at CI229 Lab 3 – Automated GPS processing and review due on 10 February 2009.

Reminder You are responsible for the material listed as REQUIRED ADDITIONAL READING in the Class 5 section of the web page.

Gravity field and steady-state Ocean Circulation Explorer

Earth’s Gravity Field from Space Satellite data was used for global models –Only useful at wavelengths of 700 km or longer Shorter wavelength data from terrestrial or marine gravity of varying vintage, quality and geographic coverage Terrestrial and marine gravity data in NGS data base.

Note the discontinuity at the shoreline.

Gravity Static gravity field –Based on long-term average within Earth system Temporally changing component –Motion of water and air –Time scale ranges from hours to decades. Mean and time variable gravity field affect the motion of all Earth space vehicles.

Is the vector sum of gravitational and centrifugal acceleration. The actual acceleration of gravity varies from place to place, depending on latitude, altitude, and local geology. By agreement among physicists, the standard acceleration of gravity gn is defined to be exactly meters per second per second (m s-2), or about feet per second per second. Gravitational Attraction

Magnitude of the potential is the work that must be done by gravity to move a unit mass from infinity to the point of interest. Is dependent on position within the gravitation field. Gravitational Potential

Surface having constant gravity potential NOT constant gravity. –Also known as level surfaces or geopotential surfaces. Surfaces are perpendicular at all points of the plumb line (gravity vector). A still lake surface is an equipotential surface. –It is not horizontal but curved. Equipotential Surfaces

Geoid The equipotential surface of the Earth's gravity field which best fits, in a least squares sense, global mean sea level.

Image from Featherstone, W, “Height Systems and Vertical Datums” Spatial Science, Vol 51 No. 1, June 2006

They are closed continuous surfaces that never cross one another. They are formed by long radius arcs. Generally without abrupt steps. They are convex everywhere. Properties of equipotential surfaces

Geopotential Number C (geopotential number) – is a value derived from the difference in gravity potential between an equipotential surface of interest and the geoid. Represents the work required to move a 1kg mass from the geoid to the geopotential surface at the point of interest. C is numerically similar to the elevation of the point in meters.

Leveling Issues Height –The distance measured along a perpendicular between a point and a reference surface. Raw leveled heights –Non-unique. Depending on the path taken a different height will be determined for the same point. They have NO physical relevance.

Equipotential Surfaces HCHC HAHA Reference Surface (Geoid)  H AC   h AB +  h BC Observed difference in orthometric height,  H, depends on the leveling route. A C B Topography  h AB  h = local leveled differences Leveled Height vs. Orthometric Height =  h BC  H = relative orthometric heights

Vertical distance from the geoid to the point of interest. (along curved plumb line). Orthometric height (H) may be determined from H = geopotential number / mean gravity along plumb line –We use assumptions about mass density to estimate mean gravity. Orthometric Height

Geopotential Numbers Geopotential numbers –Unique, path-independent –Geopotential number (C) at a point of interest (p) is the difference between the potential on the geoid and potential at the point. C = W 0 -W p

Review of Height Systems Helmert Orthometric NAVD 88 local gravity field ( ) single datum point follows MSL

How are they computed?

Dynamic Heights Takes the geopotential number at a point and divides it by a constant gravity value. The constant value used in the US is the normal gravity value at 45 degrees N latitude – gals

CC area Dynamic Heights NAVD 88 and dynamic heights differ by only 1 mm at this station.

Dynamic Heights NAVD 88 = m DYN Hght= Difference = m

Error condition: input position is inconsistent with predicted one.

Dynamic Height Problems Dynamic height corrections applied to spirit-leveled height differences can be very large (several meters) if the chosen gravity value is not representative for the region of operation.

Orthometric correction Occurs because equipotential surfaces are not parallel. In general, not parallel in a N-S direction but they are parallel in an E-W direction. It is computed as a function of mean orthometric height and latitude of section.

Leveled v Ortho. Height Diffs Due to non-parallelism of level surfaces the differences between published NAVD 88 points do not correspond to the leveled height difference. Therefore the subtraction of the published NAVD 88 heights on the NGS datasheets will NOT agree with the leveled difference. This is problem mostly in high elevations.

An example from Colorado The difference between published NAVD 88 heights is m. The leveled difference is m.